Morse inequalities at infinity for a resonant mean field equation
Abstract
In this paper we study the following mean field type equation equation* (MF) -g u \, = ( K eu∫ K eu dVg \, - \, 1) \, in , equation* where (, g) is a closed oriented surface of unit volume Volg() = 1, K positive smooth function and = 8 π m, m ∈ . Building on the critical points at infinity approach initiated in ABL17 we develop, under generic condition on the function K and the metric g, a full Morse theory by proving Morse inequalities relating the Morse indices of the critical points, the indices of the critical points at infinity, and the Betti numbers of the space of formal barycenters Bm().\\ We derive from these Morse inequalities at infinity various new existence as well as multiplicity results of the mean field equation in the resonant case, i.e. ∈ 8 π .
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